5.6 – Day 1 Modeling Harmonic Motion. 2 Objectives ► Simple Harmonic Motion ► Damped Harmonic Motion.

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Presentation transcript:

5.6 – Day 1 Modeling Harmonic Motion

2 Objectives ► Simple Harmonic Motion ► Damped Harmonic Motion

3 Modeling Harmonic Motion Periodic behavior — behavior that repeats over and over again — is common in nature. Perhaps the most familiar example is the daily rising and setting of the sun, which results in the repetitive pattern of day, night, day, night,... Another example is the daily variation of tide levels at the beach, which results in the repetitive pattern of high tide, low tide, high tide, low tide,....

4 Modeling Harmonic Motion Certain animal populations increase and decrease in a predictable periodic pattern. A large population exhausts the food supply, which causes the population to dwindle; this in turn results in a more plentiful food supply, which makes it possible for the population to increase; and the pattern then repeats over and over. Other common examples of periodic behavior involve motion that is caused by vibration or oscillation.

5 Modeling Harmonic Motion A mass suspended from a spring that has been compressed and then allowed to vibrate vertically is a simple example. This “back and forth” motion also occurs in such diverse phenomena as sound waves, light waves, alternating electrical current, and pulsating stars, to name a few. In this section, we consider the problem of modeling periodic behavior.

6 Simple Harmonic Motion

7 This figure shows the graph of y = sin t. If we think of t as time, we see that as time goes on, y = sin t increases and decreases over and over again. y = sin t

8 Simple Harmonic Motion This figure shows that the motion of a vibrating mass on a spring is modeled very accurately by y = sin t. Motion of a vibrating spring is modeled by y = sin t.

9 Simple Harmonic Motion Notice that the mass returns to its original position over and over again. A cycle is one complete vibration of an object, so the mass in the figure completes one cycle of its motion between O and P.

10 Simple Harmonic Motion Our observations about how the sine and cosine functions model periodic behavior are summarized in the next box.

11 Simple Harmonic Motion Notice that the functions y = a sin 2  t and y = a cos 2  t have frequency, because 2  /(2  ) =. Since we can immediately read the frequency from these equations, we often write equations of simple harmonic motion in this form.

12 Example 1 – A Vibrating Spring The displacement of a mass suspended by a spring is modeled by the function y = 10 sin 4  t where y is measured in inches and t in seconds (see picture). (a) Find the amplitude, period, and frequency of the motion of the mass. (b) Sketch a graph of the displacement of the mass.

13 Example 1 – A Vibrating Spring y = 10 sin 4  t (a) Find the amplitude, period, and frequency of the motion of the mass.

14 Example 1 – A Vibrating Spring y = 10 sin 4  t (b) Sketch a graph of the displacement of the mass.

15 Example 1 – A Vibrating Spring (b) The graph of the displacement of the mass at time t is shown.

16 Simple Harmonic Motion An important situation in which simple harmonic motion occurs is in the production of sound. Sound is produced by a regular variation in air pressure from the normal pressure. If the pressure varies in simple harmonic motion, then a pure sound is produced. The tone of the sound depends on the frequency, and the loudness depends on the amplitude.

17 Example 2 – Vibrations of a Musical Note A tuba player plays the note E and sustains the sound for some time. For a pure E the variation in pressure from normal air pressure is given by V(t) = 0.2 sin 80  t where V is measured in pounds per square inch and t is measured in seconds. (a) Find the amplitude, period, and frequency of V. (b) Sketch a graph of V. (c) If the tuba player increases the loudness of the note, how does the equation for V change? (d) If the player is playing the note incorrectly and it is a little flat, how does the equation for V change?

18 Example 2 – Vibrations of a Musical Note V(t) = 0.2 sin 80  t (a) Find the amplitude, period, and frequency of V.

19 Example 2 – Vibrations of a Musical Note V(t) = 0.2 sin 80  t (b) Sketch a graph of V.

20 Example 2 – Vibrations of a Musical Note V(t) = 0.2 sin 80  t (c) If the tuba player increases the loudness of the note, how does the equation for V change?

21 Example 2 – Vibrations of a Musical Note V(t) = 0.2 sin 80  t (d) If the player is playing the note incorrectly and it is a little flat, how does the equation for V change?

22 Example 2 – Vibrations of a Musical Note (b) The graph of V is shown.

23 Simple Harmonic Motion In general, the sine or cosine functions representing harmonic motion may be shifted horizontally or vertically. In this case, the equations take the form The vertical shift b indicates that the variation occurs around an average value b.

24 Simple Harmonic Motion The horizontal shift c indicates the position of the object at t = 0. (a) (b)

25 Example 4 – Modeling the Brightness of a Variable Star A variable star is one whose brightness alternately increases and decreases. For the variable star Delta Cephei, the time between periods of maximum brightness is 5.4 days. The average brightness (or magnitude) of the star is 4.0, and its brightness varies by  0.35 magnitude. (a) Find a function that models the brightness of Delta Cephei as a function of time.

26 Example 4 – Modeling the Brightness of a Variable Star (b) Sketch a graph of the brightness of Delta Cephei as a function of time.

27 Example 4 – Modeling the Brightness of a Variable Star (b) The graph is shown.

28 Simple Harmonic Motion Another situation in which simple harmonic motion occurs is in alternating current (AC) generators. Alternating current is produced when an armature rotates about its axis in a magnetic field. The figure represents a simple version of such a generator.

29 Simple Harmonic Motion As the wire passes through the magnetic field, a voltage E is generated in the wire. It can be shown that the voltage generated is given by E(t) = E 0 cos  t where E 0 is the maximum voltage produced (which depends on the strength of the magnetic field) and  /(2  ) is the number of revolutions per second of the armature (the frequency).

30 Example 6 – Modeling Alternating Current Ordinary 110-V household alternating current varies from +155 V to –155 V with a frequency of 60 Hz (cycles per second). Find an equation that describes this variation in voltage.

31 Modeling Harmonic Motion Practice: p #1, 3, 9-17o, 27-35o

– Day 2 Modeling Harmonic Motion

33 Objectives ► Simple Harmonic Motion ► Damped Harmonic Motion

34 Damped Harmonic Motion

35 Damped Harmonic Motion In the presence of friction, however, the motion of the spring eventually “dies down”; that is, the amplitude of the motion decreases with time. Motion of this type is called damped harmonic motion.

36 Damped Harmonic Motion Damped harmonic motion is simply harmonic motion for which the amplitude is governed by the function a (t) = ke –ct. The figures show the difference between harmonic motion and damped harmonic motion. (a) Harmonic motion: y = sin 8  t (b) Damped harmonic motion: y = e –t sin 8  t

37 Example 7 – Modeling Damped Harmonic Motion Two mass-spring systems are experiencing damped harmonic motion, both at 0.5 cycles per second and both with an initial maximum displacement of 10 cm. The first has a damping constant of 0.5, and the second has a damping constant of 0.1. (a) Find functions of the form g (t) = ke –ct cos  t to model the motion in each case. (b) Graph the two functions you found in part (a). How do they differ?

38 Example 7 – Modeling Damped Harmonic Motion (b) The functions g 1 and g 2 are graphed. From the graphs we see that in the first case (where the damping constant is larger) the motion dies down quickly, whereas in the second case, perceptible motion continues much longer. g 1 (t) = 10e –0.5t cos  tg 2 (t) = 10e –0.1t cos  t

39 Example 8 – A Vibrating Violin String The G-string on a violin is pulled a distance of 0.5 cm above its rest position, then released and allowed to vibrate. The damping constant c for this string is determined to be 1.4. Suppose that the note produced is a pure G (frequency = 200 Hz). Find an equation that describes the motion of the point at which the string was plucked.

40 Modeling Harmonic Motion Practice: p #2, 19-25o, 45, 46